Abstract
With few exceptions, paleodata are irregularly sampled; this poses numerous challenges for the statistical characterization of paleoindicators, this includes the indicators needed to understand the climate and macroevolution.&#160; The key variable is the measurement density - the number of measurements per unit time (r(t)). &#160;Our study used 27 paleoindicators collectively spanning time scales from years to hundreds of millions of years. Using Haar fluctuation analysis and for all the series, we show that r(t) has two scaling regimes.&#160; At high frequencies, there is a low intermittency (quasi-Gaussian) scaling regime (intermittency parameter C1 &#8776; 0).&#160; Over this regime, the fluctuation exponent H is negative implying that the chronologies become more uniform at longer time scales, r(t) is commonly close to a Gaussian white noise (H = -1/2).&#160; In contrast, at low frequencies, r(t) is highly intermittent (large C1), but it also has positive H so that fluctuations tend to grow with scale but in a highly intermittent fashion.&#160; In this this regime, &#8220;gaps&#8221; at all scales are important.&#160; The two regimes have simple physical interpretations: the high frequency behaviour can be explained by fairly smooth (but scaling) sedimentation rates, whereas the low frequencies can be explained by scaling erosion processes that introduce gaps over a wide range of scales (in conformity with the Sadler effect). To confirm this interpretation, we introduce a simple multiplicative sedimentation -&#160; erosion model that is close to the data.&#160; Finally, we empirically show that the gaps typically have extreme power law probability tails so that the series are not only scaling in time, but also in probability space. A key issue for paleontologists is the effect of variable r(t) on the paleoindicator estimates themselves (e.g. on paleotemperatures T(t)). &#160;Using Haar fluctuations we determined the fluctuation - fluctuation correlation R(&#916;t) = < &#916; r(&#916;t) &#916;T(&#916;t) >.&#160; When R(&#916;t) is small, the measurements and indicators are statistically independent so that the biases due to r(t) variability on paleoindicator statistics are easy to correct.&#160; However, at large &#916;t, the correlations are frequently large, and this poses additional difficulties in data interpretation. &#160;Strong correlations were observed in the Quaternary, but not the Holocene or Phanerozoic. Our study spans more than 8 orders of magnitude in time scale and it shows that it is wrong to theorize paleoseries as being fundamentally regularly sampled but interspersed with occasional data &#8220;holes&#8221; that can be dealt with using conventional techniques such as interpolation.&#160; While Haar fluctuation analysis is insensitive to the chronology variability - and if needed can easily be statistically corrected for any biases that it introduces - &#160;this is not true of existing spectral estimators that are extremely sensitive to scaling data gaps.&#160;
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Disclaimer: All third-party content on this website/platform is and will remain the property of their respective owners and is provided on "as is" basis without any warranties, express or implied. Use of third-party content does not indicate any affiliation, sponsorship with or endorsement by them. Any references to third-party content is to identify the corresponding services and shall be considered fair use under The CopyrightLaw.